Surfaces with c12 =9 and =5 whose canonical classes are divisible by 3

Abstract

We shall study minimal complex surfaces with c2 = 9 and =5 whose canonical classes are divisible by 3 in the integral cohomology groups, where c12 and denote the first Chern number of an algebraic surface and the Euler characteristic of the structure sheaf, respectively. The main results are a structure theorem for such surfaces, the unirationality of the moduli space, and a description of the behavior of the canonical map. As a byproduct, we shall also rule out a certain case mentioned in a paper by Ciliberto--Francia--Mendes Lopes. Since the irregularity q vanishes for our surfaces, our surfaces have geometric genus pg = 4.